The value of b for which the equation `2 log_(1//25)(bx+28)=- log_(5) (12-4x-x^(2))` has coincident roots is

The value of b for which the equation 2(log)_(1/(25))(b x+28)=-(log)_5(12-4x-x^2) has coincident roots is b=-12 (b) b=4orb=-12 (c) b=4orb=-12 (d) b=-4orb=12

The values of b for which the equation 2log_(1/25)(bx+28)=1log_5(12-4x-x^2) has coincident roots is/are

The value of x for which the equation 5*3^(log_3x)-2^(1-log_2x)-3=0

Solve the equation log_((log_(5)x))5=2

The number of roots of the equation 1+log_(2)(1-x)=2^(-x) , is

Solve the equation log_(1//3)[2(1/2)^(x)-1]=log_(1//3)[(1/4)^(x)-4]

The value of x, log_(1/2)x >= log_(1/3)x is

The number of values of x satisfying the equation log_(2)(9^(x-1)+7)=2+log_(2)(3^(x-1)+1) is :

The equation log_4(2-x)+log_(0.25)(2+x)=log_4(1-x)+log_(0.25)(2x+1) has

The sum of all the roots of the equation log_(2)(x-1)+log_(2)(x+2)-log_(2)(3x-1)=log_(2)4